If `x=cos(2t)` and `y=sin^(2)t` then what is `(d^(2)y)/(dx^(2))`

If x= e^(cos2t) and y = e^(sin2t) , then move that (dy)/(dx) = -(ylogx)/(xlogy) .

If y=int_(0)^(x)f(t)sin{k(x-t)}dt , then prove that (d^(2)y)/(dx^(2))+k^(2)y=kf(x) .

If x=cost(3-2cos^(2)t) and y=sint(3-2sin^(2)t) , find the value of (dy)/(dx) at t=(pi)/(4) .

If x=t^2, y = t^3, then (d^2y)/(dx^2) is

If x cos (a+y) = cos y, then prove that dy/dx = (cos^2(a+y))/(sina) Hence, show that sina(d^2y)/(dx^2)+ sin 2(a+y) (dy)/(dx) = 0

If x = a (cos theta + theta sin theta) and y = a (sin theta - theta cos theta) , find (d^2y)/(dx^2) at t = pi/4 .

If x = a(cost + t sint) and y = a(sint - tcost) , find (d^2y)/dx^2

If y = cos(2 cos^(-1)x) , then prove that (1 - x^2)(d^2y)/(dx) -xdy/dx + 4y = 0

If x cos (a + y)=cos y then prove that [dy/dx = cos^2 (a+ y) /sin a] . Hence show that [sin a (d^2y /dx^2) + sin 2(a+ y) dy/dx =0] .